English version below! <<<
Carə tuttə,
Vi annuncio il prossimo seminario MAP:
-->*Speaker*: Taiki Takeuchi (Waseda University)
--> *Data*: Mercoledì 26 Aprile, ore 11:00
-->* Dove*: Online su Gmeet:
-->*Titolo*:* Vanishing viscosity limit for the Navier-Stokes system and its related topics*
-->*Abstract*: *In this talk, we introduce the Navier-Stokes system and the Euler system, which are mathematical models of fluid dynamics. After explaining both models, we consider the vanishing viscosity limit of solutions. Precisely, we may expect that the solution of the Navier-Stokes system converges to that of the Euler system by taking the limit on the viscosity (some parameter). Concerning this question, we give a simple overview of the well-known result obtained by Kato (J. Funct. Anal. 9 (1972), 296--305). Finally, as its related topics, we introduce the speaker's recent result if there is time.*
Ricordiamo che questi seminari sono aperti a tuttə: la prima metà del seminario introduce i concetti e gli strumenti necessari per la seconda metà, dedicata agli argomenti di ricerca.
Per altre informazioni, visitate il nostro sito: https://seminarimap.wixsite.com/seminarimap
A presto,
Gli organizzatori: Daniele Barbera Jeremy Mirmina Mario Rastrelli Leonardo Roveri Luciano Sciaraffia
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English Version <<<
Dear all,
Here the announcement of the next MAP seminar:
-->*Speaker*: Taiki Takeuchi (Waseda University)
-->*Date*: Wednesday 26th April, 11:00
-->*Where*: Online on Gmeet:
Taiki Takeuchi https://seminarimap.wixsite.com/seminarimap/articoli/taiki-takeuchi (seminarimap.wixsite.com) https://seminarimap.wixsite.com/seminarimap/articoli/taiki-takeuchi
-->*Title*: *Vanishing viscosity limit for the Navier-Stokes system and its related topics*
-->*Abstract*: *In this talk, we introduce the Navier-Stokes system and the Euler system, which are mathematical models of fluid dynamics. After explaining both models, we consider the vanishing viscosity limit of solutions. Precisely, we may expect that the solution of the Navier-Stokes system converges to that of the Euler system by taking the limit on the viscosity (some parameter). Concerning this question, we give a simple overview of the well-known result obtained by Kato (J. Funct. Anal. 9 (1972), 296--305). Finally, as its related topics, we introduce the speaker's recent result if there is time.*
We remind that these seminars are addressed to everybody: the first half of the seminar is dedicated to the introduction of notions and tools needed in the second half, which is focused on research topics.
For more information, check our website:
https://seminarimap.wixsite.com/seminarimap
See you soon,
The organizers:
Daniele Barbera
Jeremy Mirmina
Mario Rastrelli
Leonardo Roveri Luciano Sciaraffia
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JEREMY MIRMINA